5

8 pointsFind det ( A)pueLet 2 Crowdmark j accepis PDF, JPG and PNG L ilta Gonmalav Jarrbe amalrix such that 4 4 can pe 4 4 ~ R reduced to D by the following R~R ele...

Question

8 pointsFind det ( A)pueLet 2 Crowdmark j accepis PDF, JPG and PNG L ilta Gonmalav Jarrbe amalrix such that 4 4 can pe 4 4 ~ R reduced to D by the following R~R elementary IOw 7 ~Rs D. operalions:Drag and drop your fles or click to browseor (eke pholos Hrdurwcn" 1 Yout 3

8 points Find det ( A) pue Let 2 Crowdmark j accepis PDF, JPG and PNG L ilta Gonmalav Jarr be a malrix such that 4 4 can pe 4 4 ~ R reduced to D by the following R~R elementary IOw 7 ~Rs D. operalions: Drag and drop your fles or click to browse or (eke pholos Hrdurwcn" 1 Yout 3



Answers

$12-18$ (a) Find a function $f$ such that $\mathbf{F}=\nabla f$ and $(\mathrm{b})$ use
part (a) to evaluate $\int_{c} \mathbf{F} \cdot d \mathbf{r}$ along the given curve $C .$
$$\begin{array}{l}{\mathbf{F}(x, y)=x^{2} y^{3} \mathbf{i}+x^{3} y^{2} \mathbf{j}} \\ {C : \mathbf{r}(t)=\left\langle t^{3}-2 t, t^{3}+2 t\right\rangle, \quad 0 \leqslant t \leqslant 1}\end{array}$$

For the different question, given that art and volatile chemicals zero on it, given that angle so you can find their food, which is 45 degrees on three before which is 1 35 50. So it'll compress the region. Given her this graph now, this handle the support of 45 degrees on this pretend angle is supported 1 35 degrees. So the region given by this condition given by this big space no.

Okay, So for this problem, we're looking at the interval for X is 1 to 4 and for why is 123 and of course were given two different sets of graphs, and each of them have six points involved. And if we look at the graph, it's going in increments of one for both X and for why so change in X and change and wire both one. So which means that our area, which happens to be Delta X times Delta y, is also one. But the one thing I do want to notice is that dysfunction has does not contain an X or why it is strictly a constant function. So regardless of what the X and Y values are of these points, that function value is going to be seven. So since we have six points but I'm going to Dio is I'm going to set up our area, which is one and I'm going to replace I'm a do f of x one. Why one plus f of x two y two plus f of x three Why three plus f of x four Why four plus f of x five y five plus f of x six. Why six. Okay. And so, regardless of what X and y are for any of these points thes air, all going to be seven. So seven plus seven, six times. Okay, so in other words, six times seven, which is 42. So one times 42 is going to be 42. And since the even though the points are different because that function does not have an extra white in it. Um, if you recall, our function was strictly seven. So regardless of what X and Y are that value is going to be seven always. So for both of these are answer is going to be 42.

So this problem wants you to calculate the grading of the function. Extra plus y squared plus Z squared to the native one have power plus Ellen of X y Z at the point. Negative one too negative too. All right. So if we want to calculate Well, well, well, if you want to calculate the Grady int or function, it'll be a vector comprised of its partial derivatives with respect to X respect to why and with respect to Z. So let's go ahead and company departed route is of this very long function. So I want to take the partial derivative with respect to X, you would have to first differentiates first term and we have to use chain room so we would get negative 1/2 times x squared plus y sward plus Z squared to the negative three house power because of power room times two x because of chain will we have to differentiate this part afterwards. Then we have to differentiate the natural log rhythm which is this one over, Excellency. No, we different J Excellency with respect to X. And that just gives us that just gives us y z in the numerator and you can notice that this this will cancel out, leaving us with just one next. So that's our is the party treated introspective X. Now take the part injury of respect to why we took the part injury of Perspex Ally. We can differentiate this the first time. We'll essentially be the same for the most part. They won't have off extra pounds. Wife put c squared to the native three house times to line because we're different game with respect to why and the final term will be won over. Why, All right, So if we took the derivative, the derivative with respect Z now it's more of the same. We name one halftime expert plus y squared Posey's word to the negative three house times two z plus one over Z There. Now we have all the partner it is with X Y and Z. Now I'm gonna do is plug in the values off one that plug in the 0.1 putting the point want native one to native to into the apartment narratives to find ingredient at that point. So if we were to plug in, um for X, we're plug in the points for replacement point saying one to NATO to we would end up with negative 26/27 26/27 if we plugged in the point into a part interviewed for why we would end up with 23/54 and if we plugged in the point into our partner derivative with respect is even would other. Both native 23 over 54. So now we have all our pieces. We can write that partial derivative of the function at the point native 12 Negative too, is going to be the vector off. Negative. 26/27. I had plus 23/54 j hat minus 23 over 54. Que hat, and this is your final answer.

Okay. Probably seven I have this ass on. We want to calculate the lyinto growth. So we have the formula here. This That's right, Artie. And calculate the archy T. So for the first a party, the RTD are all are 111 right. And three. Why? To accent for the oppose great tea to tea and 14. So the formula Here's house has just I thought these two factors and just GT so from 0 to 1. Three T plus two teeth us 40 right? That's part A. So we have a night in a night or two, okay. And your party. Oh, that is not an eye. That's a that's a T e o. Yeah, that's a t. So for party. Because he was another one. Okay, three y so. Three t square. Uh, R t people to three t square, two accidents to t to T and 40. So, for T to the force. Okay. And the rt ti should be 12 t n 40. You what? Cookie or Q? Okay. Just thought it senior project. Right. So from 0 to 1. Yeah. 20 square. There's four teeth. Where? Yes, 16 e to the cellar. p. So that's what the three here is. A Ellen. Right? And close. 16 over eight. That's a two. So that's 13 over three. All right, that's the first and one C See here. Well, we want to calculate what C three eights and west before is right. So seen Ethan. A bit more steps this three is from. So you're a hero to 110 So that's to be he He zero t from one. Hey, so so I are he they actually be three. Why 30 two acts to t and he says there Oh, yeah. So just from 0 to 1 three t square plus two t's where? Okay, that's five for your 55 over three, right? 05 more too. Tell me something old times the r d t s r times p r dd So that's why 10 and that should be pretty at this time. This inner product this so three people to be. So there's five over too, right as birthday three. And for C four, he's another color CFR Should the 00 t, of course, on key from one. Okay, so the rt ti could be, you know, one and we only care about are three is ah, for the So these t or tea so that he could roll or p that too, right? Oh, from this too. I see. That's Phil. Uh oh. I know. Where's the problem? Asked if he should be one won t Because accent why are both one and their constant. So if Artie should be 114 teeth here of steals 40 DT, right? Yeah, I think I'm cracked down. This is just too. So the total should be five over two plus two. That's a lie over too. Yeah. Ah, maybe.


Similar Solved Questions

5 answers
(1Opt) Solve the lineur = system of equations: Jy + 27=- 2x +Y-z=-5 2y - 22 =
(1Opt) Solve the lineur = system of equations: Jy + 27=- 2x +Y-z=-5 2y - 22 =...
5 answers
23 kJlmol: What Is Its vapor pressure % 38 pressure is 307 mmHg 20"C,and its molar heat of vaporization liquid $ = vaporSelect one: 188 mmHg 396 mmHg 500 mmHg 614 mmHg6anrk
23 kJlmol: What Is Its vapor pressure % 38 pressure is 307 mmHg 20"C,and its molar heat of vaporization liquid $ = vapor Select one: 188 mmHg 396 mmHg 500 mmHg 614 mmHg 6anrk...
5 answers
212008 01 F1
212 008 0 1 F 1...
5 answers
1) :-x2 _ 2y2 +2x-4y-2 =0 denklemi(yiizeyi) veriliyor Yiizeyin,(1OP)a) 2 = 0 dizlemi ile arakesit egrisinin tirinu belirleyiniz ve cizimini yapiniz.(SP)b) (0.0.2) noktasindaki teget dizleminin denklemini yaziniz.(SP)d) (0,0,2) ile (4,1,2) noktalari birlestiren dogru boyunca yonli turevinin (0,0,2) noktasindaki degerini hesaplayiniz
1) :-x2 _ 2y2 +2x-4y-2 =0 denklemi(yiizeyi) veriliyor Yiizeyin, (1OP)a) 2 = 0 dizlemi ile arakesit egrisinin tirinu belirleyiniz ve cizimini yapiniz. (SP)b) (0.0.2) noktasindaki teget dizleminin denklemini yaziniz. (SP)d) (0,0,2) ile (4,1,2) noktalari birlestiren dogru boyunca yonli t...
5 answers
Question 8Solve Scos?(4x) 5over the interval [o5):Ox= 16b) Ox = 163 I x=S0 14 76 16 X= 16 c) Ox= 16 X= 13 I d)e*= 165 OX T6 X= 2None of the above_
Question 8 Solve Scos?(4x) 5 over the interval [o5): Ox= 16 b) Ox = 16 3 I x=S0 14 76 16 X= 16 c) Ox= 16 X= 1 3 I d)e*= 16 5 OX T6 X= 2 None of the above_...
5 answers
Hov many mullliter: of 0.155 HCI arc nceded Netcralcompletely 35 6Ba(OH) z solution?(D) How many mlniiltersHzSOneedenneutralize 75.0NaDh?(c) IP 54.8 ML DaCl , solutlon Falaehedpracipitatehc Tullate534 MQ coniplNyjS0= ormino BaSO4).tne molatityInercoluriont(d) I} 37,5 mL of 0.125 HCI solution needeu nculmallte soltlonCa(OH)z, nowmanyarms Ca(Om)z Must be Ine solutlo1?
Hov many mullliter: of 0.155 HCI arc nceded Netcral completely 35 6 Ba(OH) z solution? (D) How many mlniilters HzSO needen neutralize 75.0 NaDh? (c) IP 54.8 ML DaCl , solutlon Falaehed pracipitate hc Tullate 534 MQ conipl NyjS0= ormino BaSO4). tne molatity Inercoluriont (d) I} 37,5 mL of 0.125 HCI s...
5 answers
Elurdng Irblez bua contains mdimarblu Mhl Aencha Find the followlng Enbor Vqueanswcre fractians decimul: rounotdblun marblet Rardomi choox tna miartius thmr drclma Placetuira nhd uithout raeeenPjtt0 / 3Pert 1 01probabiety thot the frst marble Khtoand [ne cucond(rrst Han and ~econd bluc)
Elurdng Irblez bua contains mdimarblu Mhl Aencha Find the followlng Enbor Vqueanswcre fractians decimul: rounotd blun marblet Rardomi choox tna miartius thmr drclma Placet uira nhd uithout raeeen Pjtt0 / 3 Pert 1 01 probabiety thot the frst marble Khtoand [ne cucond (rrst Han and ~econd bluc)...
5 answers
Tebe' Loco ulobtJadu:FcrmuaeRMoecnaoc -crmi~ShanNCommcnt> {rat= Dt~CGbti MBoz iTA = TaNcuna:omnrn ~FJry=e5nLotoet -antHelbolTeracrtun pokon; UatenFcaucictECEMAMTEAeidae Incrahytemfeiste IFi alce CunCtamlc-ino Irt#nuinas Iurio: Dosccr Montht Flont Fj clll Mamt hk watey U~Le "eallains;pcanmcinmFcrjnsJeiKhentiEMeekSnacWa FIxpercicto #arh0Anco?r7
Tebe' Loco ulobt Jadu: Fcrmuae RMoe cnaoc -crmi ~Shan NCommcnt > {rat= Dt~ CGbti MBoz i TA = Ta Ncuna :omnrn ~FJry =e5n Lotoet -ant Helbol Teracrtun pokon; Uaten Fcaucict ECEMAMTE Aeidae Incrahytemfeiste IFi alce CunCtamlc-ino Irt#nuinas Iurio: Dosccr Montht Flont Fj clll Mamt hk watey U~Le ...
5 answers
Question 49 (2 points) 8. Let's denote the events_ M= the participant is male, F = the participant is female; R = the participant is right-handed, L the participant is left-handed. There are 52 males and 48 females in a group of 100 individuals, organized by gender and 87 participants are right-handed or 13 participants are left-handed. Compute the probability of P(FIL) Please round to three decimal places_0.3080.430.0830.827
Question 49 (2 points) 8. Let's denote the events_ M= the participant is male, F = the participant is female; R = the participant is right-handed, L the participant is left-handed. There are 52 males and 48 females in a group of 100 individuals, organized by gender and 87 participants are right...
1 answers
An ideal spring is used to stop blocks as they slide along a table without friction (Figure 6-49). A 0.85-kg block traveling at a speed of $2.1 \mathrm{~m} / \mathrm{s}$ can be stopped over a distance of $0.15 \mathrm{~m}$, once it makes contact with the spring. What distance would a 1.3-kg block travel after making contact with the spring, if the block were traveling at a speed of $3.3 \mathrm{~m} / \mathrm{s}$ ? Example $6-13$
An ideal spring is used to stop blocks as they slide along a table without friction (Figure 6-49). A 0.85-kg block traveling at a speed of $2.1 \mathrm{~m} / \mathrm{s}$ can be stopped over a distance of $0.15 \mathrm{~m}$, once it makes contact with the spring. What distance would a 1.3-kg block tr...
5 answers
Daia set below represents Ihe doe8 04 36 execullvesPeicanlile Ihet correspcaas to &n 8geVe-mePulcerula 0i40(Roura Fa nanron Inlenurnecaod ,
daia set below represents Ihe doe8 04 36 execullves Peicanlile Ihet correspcaas to &n 8ge Ve-me Pulcerula 0i40 (Roura Fa nanron Inlenur necaod ,...
3 answers
Find the inverse Laplace transform of the following functions. (a) F(s) 4H 82-2s+10 (b) G(s) 8(8+1)2 H(s) 122 262+4)
Find the inverse Laplace transform of the following functions. (a) F(s) 4H 82-2s+10 (b) G(s) 8(8+1)2 H(s) 122 262+4)...
5 answers
What is the buoyant force (in Newtons) on a solid cube (eachside is 0.50 meters long) that is submerged in water (density =1000 kg/m3) to a depth of 2 meters? a. 250 b. 125 c. 500 d.150
What is the buoyant force (in Newtons) on a solid cube (each side is 0.50 meters long) that is submerged in water (density = 1000 kg/m3) to a depth of 2 meters? a. 250 b. 125 c. 500 d. 150...
5 answers
~I5 POINTSLARCALCTI 4.5.020_ 0/2 Submissions UsedFind the indefinlte integral and check the result by differentlatlan. (Use for the constant of Integratlon )8u"Vu9 + 6 du-/5 POINTSLARCALC11 4.5.048 0/2 Submissions UsedFind the indefinite integral. (Use for the constantIntegratlon )cos"0/5 POINTSPREVIOUS ANSWERSLARCALCT1 4.5.053 1/2 Submissions Usedindelnite Inteeral by making chandevorlablcs (Usc for the constantintegration:)[*xs
~I5 POINTS LARCALCTI 4.5.020_ 0/2 Submissions Used Find the indefinlte integral and check the result by differentlatlan. (Use for the constant of Integratlon ) 8u"Vu9 + 6 du -/5 POINTS LARCALC11 4.5.048 0/2 Submissions Used Find the indefinite integral. (Use for the constant Integratlon ) cos&q...

-- 0.021924--